Introduction

Definitions

• What is a set — A collection of distinct elements.
• What is an element — A member of a set.
• Notation — Usually written using {} e.g. {0,1,2,3,5,8}
• Cardinality — The number of elements in the set. The above set has cardinality 6.

Types of Sets

Countably Infinite Sets

A set is countably infinite if you can line up every element so each one has its own unique index. (One‑to‑one correspondence with the natural numbers.)

Examples: N — Natural numbers

 {0,1,2,3,...} or {1,2,3,4,...}

Z — Integers

 {..., -2, -1, 0, 1, 2, ...}

Z⁺ — Positive integers

 {1,2,3,4,...}

Q — Rational numbers (p/q) where p is an integer and q is a non‑zero integer.

Uncountably Infinite Sets

These sets have “more” elements than there are natural numbers — you cannot assign each element a unique index.

Example: real numbers between 0 and 1

 0.1, 0.11, 0.111, 0.2, 0.22, 0.222, ...

R — Real numbers C — Complex numbers

Finite Sets

A set with a limited number of elements. Its cardinality is a natural number.

Examples:

• primary colours (red, yellow, blue)
• days of the week
• hours in the day

Why I’m Here

The set of remainders of integers modulo n.

For a given integer n, the possible remainders are:

 {0, 1, 2, ..., n−1}

So for modulo n:

• Cardinality = n
• Largest element = n−1

We are focusing on the **remainder** — the amount left over — not the quotient (how many times it divides exactly).

Example:

 (7 + 3) mod 5
 7 + 3 = 10
 10 = 5 × 2 + 0
 Quotient = 2  
 Remainder = 0  

So the answer is 0.